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Research Report MRR97-049
Invariants of elliptic and hyperbolic CR-structures of codimension
2
V.V. Ezhov, A.V. Isaev, G. Schmalz
Abstract:
We reduce CR-structures on smooth elliptic and hyperbolic
manifolds of CR-codimension 2 to parallelisms thus solving the
problem of global equivalence for such manifolds. The parallelism that we
construct is defined on a sequence of two principal bundles over the manifold, takes values in the Lie algebra of infinitesimal
automorphisms of the quadric corresponding to the Levi form of the manifold, and behaves
``almost'' like a Cartan connection. The construction is explicit and
allows us to study the properties of the parallelism as well as those of its curvature
form. It also leads to a
natural class of ``semi-flat'' manifolds for which the two bundles
reduce to a single one and the parallelism
turns into a true Cartan connection.
In addition, for real-analytic manifolds we describe certain
local normal forms that do not require passing to bundles, but in many ways agree with the structure of the parallelism.
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